Title :
A new reverse jacket transform and its fast algorithm
Author_Institution :
Inst. of Inf. & Commun., Chonbuk Nat. Univ., Chonju, South Korea
fDate :
1/1/2000 12:00:00 AM
Abstract :
This paper presents the reverse jacket transform [RJT] and a simple decomposition of its matrix, which is used to develop a fast algorithm for the RJT. The matrix decomposition is of the form of the matrix products of Hadamard matrices and successively lower order coefficient matrices. This decomposition very clearly leads to a block circular sparse matrix factorization of the reverse jacket [RJ]N matrix. The main property of [RJ]N is that the inverse matrices of its elements can be obtained very easily and have a special structure. [RJ]N is derived using the weighted Hadamard transform corresponding to the Hadamard matrix [H]N and a basic symmetric matrix Λ. Each element of [RJ]N is a generalized for polygonal subsampling and canonical Smith form. In this paper we represent in particular the systematical block-wise sparse matrix of extending-method for [RJ]N
Keywords :
Hadamard matrices; Hadamard transforms; data compression; matrix decomposition; sparse matrices; Hadamard matrices; block circular sparse matrix factorization; block-wise sparse matrix; canonical Smith form; coefficient matrices; extending-method; inverse matrices; matrix decomposition; polygonal subsampling; reverse jacket transform; symmetric matrix; weighted Hadamard transform; Error correction; Error correction codes; Fast Fourier transforms; Helium; Matrix decomposition; Moon; Multiaccess communication; Signal processing algorithms; Sparse matrices; Symmetric matrices;
Journal_Title :
Circuits and Systems II: Analog and Digital Signal Processing, IEEE Transactions on
